Global ETD Search

1	Halfcanonical rings on algebraic curves and applications to surfaces of general type Neves, Jorge Manuel Sentieiro January 2003 (has links) No description available. 514.224
2	Automorphism groups of omega-categorical structures Barbina, Silvia January 2004 (has links) No description available. 514.224
3	Monotonizations of countable paracompactness Haynes, Lylah January 2005 (has links) No description available. 514.224
4	Local to global methods in o-minimal expansions of fields Jones, Gareth Owen January 2006 (has links) No description available. 514.224
5	Stacks and formal maps of crossed modules Lewis, Richard P. I. January 2007 (has links) No description available. 514.224
6	On the geometry of rank two vector bundles and two-theta divisors on a curve Scataglini, Giovanna January 2003 (has links) This thesis aims at presenting results and remarks concerning the study of subvarieties of the projective space \|2Ɵ\| associated to a smooth projective curve C of genus at least 3 and its connections to the moduli space SU(_c)(2) of rank 2 semi-stable vector bundles with trivial determinant. In the first part of the thesis, I present a review of Narasimhan and Ramanan's embedding of SU(_C)(2) in \|2Ɵ\| for non-hyperelliptic curves of genus 3 ([N-R2]). In particular, I clarify some of the points of their construction (2.3.6) and give complete proofs of lemma 5.1 and lemma 5.2 (see 2.3.4 and 2.3.17). Moreover in section 2.3 I show that lemma 5.4 of [N-R2] is false, providing an extensive counterexample (2.4.3).In the second part, I discuss the Abel-Jacobi stratification of \|2Ɵ\| for non-hyperelliptic curves of genus at least 3 as introduced in [0-P], which generalises classical subvarieties of \|2Ɵ\| such as the Kummer variety. I show that the top element of these stratifications is always a hypersurface and compute its degree (3.2.5), then I provide insight into the characterisation of the general element of the stratification (§3.3). 514.224
7	Quantales and noncommutative sober spaces McNaughton, James B. January 2005 (has links) No description available. 514.224
8	Involutive quantales Ramos, Joel Zamora January 2006 (has links) No description available. 514.224
9	Plat closure of braids Tawn, Stephen James January 2008 (has links) Given a braid b ∈ B2n we can produce a link by joining consecutive pairs of strings at the top, forming caps, and at the bottom, forming cups. This link is called the plat closure of b. The set of all braids that fix the caps form a subgroup H2n and the plat closure of a braid is unchanged after multiplying on the left or on the right by elements of H2n. So plat closure gives a map from the double cosets H2n\B2n/H2n to the set of isotopy classes of non-empty links. As well moving within a double coset there is a stabilisation move which leaves the plat closure unchanged but increases the braid index by two and multiplies on the right by σ2n. Birman [2] has shown that any two braid with isotopic plat closures can be related by a sequence of double coset and stabilisation moves. In Chapter 1 we show that if we change the way we draw the cups then we can use twisted cabling as the stabilisation move. Moreover, we show that any two braids with equal plat closure can be stabilised until they lie in the same double coset. If we restrict to even braids then we can give the plat closure a well defined orientation. In this case we show that untwisted cabling can be used as the stabilisation move. Assuming an oriented version of Birman’s result we construct a groupoid G and two subgroupoids H+ and H− which satisfy the following. All the even braid groups embed in G. There is a plat closure map on G which takes the same value on the embedded even braid group. This plat closure is constant on the double cosets H+\G/H− and induces a bijection between double cosets and isotopy classes of non-empty oriented links. In Chapter 2 we compute a presentation for H2n. To do this we construct a 2-complex Xn on which H2n acts. Then we show that this complex is simply connected, the action is transitive on the vertex set and the the number of edge and face orbits is finite. We get generators from each edge orbit and relations from the edge and face orbits. In the final chapter we compute a presentation for the intersection of H2n and the pure braid group. 514.224 QA Mathematics
10	Quantum topology and the Lorentz group Martins, João Nuno Gonçalves Faria January 2004 (has links) We analyse the perturbative expansion of knot invariants related with infinite dimensional representations of sl(2,R) and the Lorentz group taking as a starting point the Kontsevich Integral and the notion of central characters of infinite dimensional unitary representations of Lie Groups. The prime aim is to define C-valued knot invariants. This yields a family of C([h])-valued knot invariants contained in the Melvin-Morton expansion of the Coloured Jones Polynomial. It is verified that for some knots, namely torus knots, the power series obtained have a zero radius of convergence, and therefore we analyse the possibility of obtaining analytic functions of which these power series are asymptotic expansions by means of Borel re-summation. This process is complete for torus knots, and a partial answer is presented in the general case, which gives an upper bound on the growth of the coefficients of the Melvin-Morton expansion of the Coloured Jones Polynomial. In the Lorentz group case, this perturbative approach is proved to coincide with the algebraic and combinatorial approach for knot invariants defined out of the formal R-matrix and formal ribbon elements in the Quantum Lorentz Group, and its infinite dimensional unitary representations. 514.224 QA611 Topology

Search results